305 
so that for the factor of z is found (see above): 
w= (iter te): for that of z? we have 
NN TL 
wt iet Se cae ): we get further 
Wet 24 12,8 A an 
sp (345618 35 678910 
en Et en reen 
3 4.5.6.7.8 a? 
2° 1.2.3.4.50' 
while on the other hand according to (3) P, evidently becomes 
On the one hand e.g. 67, approaches for /= o to 
13) a’ 
=(s, + a) ee if xv, represents the coefficient of la’. In P, we 
1 S(ntD)(nt2(n 483) Ant3 (n+2)(n +3) _ 
have therefore z, —=—— 
n+12 6 ne Ef 4 
An 43 ed ach, 
2 4 
, by which the above is proved. 
According to (4) we can now write for F':e*: 
Fines otf. Agi Sebi Ba? a?/3 4.5.6 3.5 6.7.84? 
(=0) = 25, ertoe Tota gst} + 
24°12 He’ 123 24123 
a? (3 45.678 3.5 6.7.8.9.10 a? : 
aC Wes 84 128d ee ‚)e ten 
or also: 
GOE a1 Gel ce Se Sf, BE teha | En 
2 I: TE RAP WEP ene 
45.6 2° Ne nRa 50 ag 
dl a eertig: dee ett 
6.7.8 «4 1-6,718:9.10e7 57:89:10, lot af 
| + etc. |, 
T3340 4° 4.5.6.7.8 ptae 45678 F 
16; 
rn es 4+ 25 gi tigate | + 
2 is 12 / | 1287 
Le. 3200" x! 45 a? Go 
Be kel ns: jn i! ere 
ale ete. | 
(z—0) ae 12 De E aL b et + 4 Ps + ete. | . (4a) 
e? 
45 )1+ 
for which may be written: 
